Branching laws for Stein's complementary series and Speh representations of GL(2n,R)

Abstract

We obtain the explicit direct integral decomposition of Stein's complementary series representations and Speh representations of GL(2n,R) when restricted to the subgroup GL(2n-1, R). The decomposition is a direct integral of unitarily induced representations from a maximal parabolic subgroup of GL(2n-1, R) with Levi factor GL(2n-2, R)×GL(1, R), where the induction data consists of a complementary series or Speh representation of the factor GL(2n-2, R) with the same parameter as the one of GL(2n, R) and a character of GL(1, R). These results are in line with the theory of adduced representations. The main tools in the proof are two families of symmetry breaking operators between degenerate series representations of GL(2n, R) and GL(2n-1, R) whose meromorphic properties are studied in great detail.